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Chapter 1: ConstraintsChapter 1: Constraints

What are they, what do they do and what can I use them for.

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ConstraintsConstraints

What are constraints? Modelling problems Constraint solving Tree constraints Other constraint domains Properties of constraint solving Topic for later: constraints and state

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ConstraintsConstraints

Variable: a place holder for valuesX Y Z L U List, , , , ,3 21

Function Symbol: mapping of values to values

Relation Symbol: relation between values

, , , ,sin,cos,||

, ,

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ConstraintsConstraints

X

X Y

4

2 9

Primitive Constraint: constraint relation with arguments

Constraint: conjunction of primitive constraints

X X Y Y 3 4

5

SatisfiabilitySatisfiability

Valuation: an assignment of values to variables

{ , , }

( ) ( )

X Y Z

X Y

3 4 2

2 3 2 4 11

Solution: valuation which satisfies constraint

( )

( )

X Y X

true

3 1

3 3 4 3 1

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SatisfiabilitySatisfiability

Satisfiable: constraint has a solution

Unsatisfiable: constraint does not have a solution

X Y X

X Y X Y

3 1

3 1 6

satisfiable

unsatisfiable

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Constraints as SyntaxConstraints as Syntax

Constraints are strings of symbols Brackets don't matter (don't use them)

Order does matter

Some algorithms will depend on order

( ) ( )X Y Z X Y Z 0 1 2 0 1 2

X Y Z Y Z X 0 1 2 1 2 0

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Equivalent ConstraintsEquivalent Constraints

Two different constraints can represent the same information

X X

X Y Y X

X Y Y X Y X

0 0

1 2 2 1

1 2 1 3

Two constraints are equivalent if they have the same set of solutions

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Modelling with constraintsModelling with constraints

Constraints describe idealized behaviour of objects in the real world

II1

I2

V

+

--3_

+

--

V1V2

--

R1 R2

V I R

V I R

V V

V V

V V

I I I

I I I

1 1 1

2 2 2

1 0

2 0

1 2 0

1 2 0

1 2 0

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Modelling with constraintsModelling with constraintsB u ild in g a H ou se

D oors2 d ays

S tag e B

In te rio r W a lls4 d ays

C h im n ey3 d ays

S tag e D

S tag e E

Tiles3 d ays

R oo f2 d ays

W in d ow s3 d ays

S tag e C

E xte rio r W a lls3 d ays

S tag e A

F ou n d a tion s7 d ays

S tag e ST

T T

T T

T T

T T

T T

T T

T T

T T

S

A S

B A

C A

D A

D C

E B

E D

E C

0

7

4

3

3

2

2

3

3

start

foundations

interior walls

exterior walls

chimney

roof

doors

tiles

windows

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Constraint SatisfactionConstraint Satisfaction

Given a constraint C two questions satisfaction: does it have a solution? solution: give me a solution, if it has one?

The first is more basic A constraint solver answers the satisfaction

problem

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Constraint SatisfactionConstraint Satisfaction

How do we answer the question? Simple approach try all valuations.

X Y

X Y false

X Y false

X Y false

{ , }

{ , }

{ , }

1 1

1 2

1 3

X Y

X Y false

X Y true

X Y false

X Y true

X Y true

{ , }

{ , }

{ , }

{ , }

{ , }

1 1

2 1

2 2

3 1

3 2

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Constraint SatisfactionConstraint Satisfaction

The enumeration method won’t work for reals

A smarter version will be used for finite domain constraints

How do we solve constraints on the reals? => Gauss-Jordan elimination

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Gauss-Jordan eliminationGauss-Jordan elimination

Choose an equation c from C Rewrite c into the form x = e Replace x everywhere else in C by e Continue until

all equations are in the form x = e or an equation is equivalent to d = 0 (d != 0)

Return true in the first case else false

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Gauss-Jordan Example 1Gauss-Jordan Example 11 2

3

5

X Y Z

Z X

X Y Z

Replace X by 2Y+Z-1

X Y Z

Z Y Z

Y Z Y Z

2 1

2 1 3

2 1 5

Replace Y by -1

X Z

Y

Z Z

2 1

1

2 1 1 5

1 2 X Y Z

2 2Y

4 5

Return false

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Gauss-Jordan Example 2Gauss-Jordan Example 21 2

3

X Y Z

Z X

Replace X by 2Y+Z-1

X Y Z

Z Y Z

2 1

2 1 3

Replace Y by -1

X Z

Y

3

1

1 2 X Y Z

2 2Y

Solved form: constraints in this form are satisfiable

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Solved FormSolved Form

Non-parametric variable: appears on the left of one equation.

Parametric variable: appears on the right of any number of equations.

Solution: choose parameter values and determine non-parameters

X Z

Y

3

1Z 4 X

Y

4 3 1

1

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Tree ConstraintsTree Constraints

Tree constraints represent structured data Tree constructor: character string

cons, node, null, widget, f Constant: constructor or number Tree:

A constant is a tree A constructor with a list of > 0 trees is a tree Drawn with constructor above children

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Tree ExamplesTree Exampleso r d e r

p a r t q u a n t i t y d a t e

7 7 6 6 5 w i d g e tw i d g e t

1 7 3 f e b 1 9 9 4

r e d m o o s e

order(part(77665, widget(red, moose)), quantity(17), date(3, feb, 1994))

cons

cons

cons

red

blue

red

cons

cons(red,cons(blue,cons(red,cons(…))))

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Tree ConstraintsTree Constraints

Height of a tree: a constant has height 1 a tree with children t1, …, tn has height one

more than the maximum of trees t1,…,tn Finite tree: has finite height Examples: height 4 and height

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TermsTerms

A term is a tree with variables replacing subtrees

Term: A constant is a term A variable is a term A constructor with a list of > 0 terms is a term Drawn with constructor above children

Term equation: s = t (s,t terms)

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Term ExamplesTerm Examples

p a r t Q d a te

7 7 6 6 5 w id g e tw id g e t

3 f e b Y

C m o o s e

o r d e r

order(part(77665, widget(C, moose)), Q, date(3, feb, Y))

cons

cons

L

red

B

red

cons

cons(red,cons(B,cons(red,L)))

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Tree Constraint SolvingTree Constraint Solving

Assign trees to variables so that the terms are identical cons(R, cons(B, nil)) = cons(red, L)

Similar to Gauss-Jordan Starts with a set of term equations C and an

empty set of term equations S Continues until C is empty or it returns false

{ , ( , ), }R red L cons blue nil B blue

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Tree Constraint SolvingTree Constraint Solving

unifyunify(C) Remove equation c from C case x=x: do nothing case f(s1,..,sn)=g(t1,..,tn): return false case f(s1,..,sn)=f(t1,..,tn):

add s1=t1, .., sn=tn to C

case t=x (x variable): add x=t to C case x=t (x variable): add x=t to S

substitute t for x everywhere else in C and S

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Tree Solving ExampleTree Solving Example

cons Y nil cons X Z Y cons a T

Y X nil Z Y cons a T

nil Z X cons a T

Z nil X cons a T

X cons a T

true

( , ) ( , ) ( , )

( , )

( , )

( , )

( , )

true

true

Y X

Y X

Y X Z nil

Y cons a T Z nil X cons a T

( , ) ( , )

C S

{ , ( , ), ( , ), }T nil X cons a nil Y cons a nil Z nil

Like Gauss-Jordan, variables are parameters or non-parameters. A solution results from setting parameters (I.e T) to any value.

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One extra caseOne extra case

Is there a solution to X = f(X) ? NO!

if the height of X in the solution is n then f(X) has height n+1

Occurs check: before substituting t for x check that x does not occur in t

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Other Constraint DomainsOther Constraint Domains

There are many Boolean constraints Sequence constraints Blocks world

Many more, usually related to some well understood mathematical structure

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Boolean ConstraintsBoolean Constraints

Used to model circuits, register allocation problems, etc.

X

Y

ZO

A N

An exclusive or gate

O X Y

A X Y

N A

Z O N

( )

( & )

( & )

Boolean constraint describing the xor circuit

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Boolean ConstraintsBoolean ConstraintsX

Y

ZO

A N

FO O X Y

FA A X Y

FN N A

FG Z N O

( ( ))

( ( & ))

( )

( ( & )

Constraint modelling the circuit with faulty variables

( & ) ( & ) ( & )

( & ) ( & ) ( & )

FO FA FO FN FO FG

FA FN FA FG FN FGConstraint modelling that only one gate is faulty

{ , , }X Y Z 0 0 1

{ , , , ,

, , , , , }

FO FA FN FG

X Y O A N Z

1 0 0 0

0 0 1 0 1 1

Observed behaviour:Solution:

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Boolean SolverBoolean Solver

let m be the number of primitive constraints in C

epsilon is between 0 and 1 and

determines the degree of incompleteness

for i := 1 to n do

generate a random valuation over the variables in C

if the valuation satisfies C then return true endif

endfor

return unknown

n

mm

:ln( )

ln( ( )

1 11

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Boolean ConstraintsBoolean Constraints

Something new? The Boolean solver can return unknown It is incomplete (doesnt answer all

questions) It is polynomial time, where a complete

solver is exponential (unless P = NP) Still such solvers can be useful!

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Blocks World ConstraintsBlocks World Constraints

Objects in the blocks world can be on the floor or on another object. Physics restricts which positions are stable. Primitive constraints are e.g. red(X), on(X,Y), not_sphere(Y).

floor

Constraints don't have to be mathematical

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Blocks World ConstraintsBlocks World Constraints

A solution to a Blocks World constraint is a picture

with an annotation of which variable is which block

yellow Y

red X

on X Y

floor Z

red Z

( )

( )

( , )

( )

( )

Y

X

Z

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Solver DefinitionSolver Definition

A constraint solver is a function solv which takes a constraint C and returns true, false or unknown depending on whether the constraint is satisfiable if solv(C) = true then C is satisfiable if solv(C) = false then C is unsatisfiable

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Properties of SolversProperties of Solvers

We desire solvers to have certain properties well-behaved:

set based: answer depends only on set of primitive constraints

monotonic: is solver fails for C1 it also fails for C1 /\ C2

variable name independent: the solver gives the same answer regardless of names of vars

solv X Y Y Z solv T U U Z( ) ( ) 1 1

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Properties of SolversProperties of Solvers

The most restrictive property we can ask complete: A solver is complete if it always

answers true or false. (never unknown)

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Constraints SummaryConstraints Summary

Constraints are pieces of syntax used to model real world behaviour

A constraint solver determines if a constraint has a solution

Real arithmetic and tree constraints Properties of solver we expect (well-

behavedness)